Measure Spaces: O-Finite and Probability Measures

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Related lectures (32)

Conditional Expectation

Covers conditional expectation, Fubini's theorem, and their applications in probability theory.

Probability Theory: Lecture 2

Explores toy models, sigma-algebras, T-valued random variables, measures, and independence in probability theory.

Properties of Complete Spaces

Covers the properties of complete spaces, including completeness, expectations, embeddings, subsets, norms, Holder's inequality, and uniform integrability.

Convergence of Random Variables

Explores different modes of convergence for random variables.

Conditional Expectation: Properties & Jensen's Inequality

Covers the properties of conditional expectation and Jensen's inequality in probability theory.

Lebesgue Integration: Cantor Set

Explores the construction of the Lebesgue function on the Cantor set and its unique properties.

Lebesgue Integration: Simple Functions

Covers the Lebesgue integration of simple functions and the approximation of nonnegative functions from below using piecewise constant functions.

Approximation by Smooth Functions

Discusses approximation by smooth functions and the convergence of function sequences in normed vector spaces.

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Convergence in Law: Theorem and Proof

Explores convergence in law for random variables, including Kolmogorov's theorem and proofs based on probability lemmas.

Information Measures

Covers information measures like entropy, Kullback-Leibler divergence, and data processing inequality, along with probability kernels and mutual information.

Completeness of Lp Spaces

Delves into the completeness of Lp spaces and the density of function classes in L².

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